The position x of a partical at time t is given by `x =(V_0)/(a) (1 -e^(9-at))` where `V_0` is a constant and a gt 0. The dimensions of `V_0` and a are.

The position x of a particle at time t is given by x=(V_(0))/(a)(1-e^(-at)) , where V_(0) is constant and a gt 0 . The dimensions of V_(0) and a are

The position x of a particle at time t is given by : x=(v_(0))/(a)(1-e^(-at)) where v_(0) is a constant and a>0. The dimensional formula of v_(0) and a is :

The position of particle at time t is given by, x(t) = (v_(0)//prop) (1-e^(-ut)) where v_(0) is a constant prop gt 0 . The dimension of v_(0) and prop are,

The position of a particle at time t is given by the relation x (t) = (v_(0))/(A) (1 - e^(-At)) , where v_(0) is constant and A gt 0 . The dimensions of v_(0) and A respectively

The instantaneous position of a particle is given by S(t) = V_(0) (1 - e^(-at))//a , where a and V_(0) are constants and a gt 0 . What are the dimensions of a and V_(0) ?

The position of a particle at time t is given by the equation x(t) = V_(0)/A (1-e^(At)) V_(0) = constant and A > 0 Dimensions of V_(0) and A respectively are